Simplify \(2\times \frac{2x+3}{x-4}\) to \(\frac{2(2x+3)}{x-4}\).
\[l\imath mx->\frac{2(2x+3)}{x-4}\]
Regroup terms.
\[-+l\imath mx>\frac{2(2x+3)}{x-4}\]
Divide both sides by \(\imath \).
\[-+lmx>\frac{\frac{2(2x+3)}{x-4}}{\imath }\]
Simplify \(\frac{\frac{2(2x+3)}{x-4}}{\imath }\) to \(\frac{2(2x+3)}{\imath (x-4)}\).
\[-+lmx>\frac{2(2x+3)}{\imath (x-4)}\]
Divide both sides by \(m\).
\[-+lx>\frac{\frac{2(2x+3)}{\imath (x-4)}}{m}\]
Simplify \(\frac{\frac{2(2x+3)}{\imath (x-4)}}{m}\) to \(\frac{2(2x+3)}{\imath m(x-4)}\).
\[-+lx>\frac{2(2x+3)}{\imath m(x-4)}\]
Divide both sides by \(x\).
\[-+l>\frac{\frac{2(2x+3)}{\imath m(x-4)}}{x}\]
Simplify \(\frac{\frac{2(2x+3)}{\imath m(x-4)}}{x}\) to \(\frac{2(2x+3)}{\imath mx(x-4)}\).
\[-+l>\frac{2(2x+3)}{\imath mx(x-4)}\]
Multiply both sides by \(-1\).
\[l<-\frac{2(2x+3)}{\imath mx(x-4)}\]
l<-(2*(2*x+3))/(IM*m*x*(x-4))
